The idea behind the fixed point method is very simple: to find the solutions of a given nonlinear function
f(x) = 0, it is possible to rearrange f(x)= 0 into the form x = g(x), where g(x) denotes a function of x. Then, simply
start with an initial guess, x0 and apply the iteration process:

xn = g(xn - 1) for n = 1,2,3,...

For example, to find solutions for the following nonlinear equation:

f(x) = sin x + ex + x2 - 2x = 0

There are several ways to rewrite the above equation into the form x = g(x). For example, it is possible to
rearrange the above equation into the following form:

An interesting display of features initially created on "KMP Engineering" website. Google+ allows
to share content and at the same time link items to KMP Engineering for
further discussion and investigation.

LINKED IN

A social network designed with basic profile that reflects skills, employment history
and education.

PUBLICATIONS

A series of articles related to the use of mathematical algorithms in mining. EzineArticles is
an article submission website in a professional setting.